Non-ergodic extended states in β-ensemble

Abstract

Matrix models showing chaotic-integrable transition in the spectral statistics are important for understanding Many Body Localization (MBL) in physical systems. One such example is the β-ensemble, known for its structural simplicity. However, eigenvector properties of β-ensemble remain largely unexplored, despite energy level correlations being thoroughly studied. In this work we numerically study the eigenvector properties of β-ensemble and find that the Anderson transition occurs at γ = 1 and ergodicity breaks down at γ = 0 if we express the repulsion parameter as β = N-γ. Thus other than Rosenzweig-Porter ensemble (RPE), β-ensemble is another example where Non-Ergodic Extended (NEE) states are observed over a finite interval of parameter values (0 < γ < 1). We find that the chaotic-integrable transition coincides with the breaking of ergodicity in β-ensemble but with the localization transition in the RPE or the 1-D disordered spin-1/2 Heisenberg model where this coincidence occurs at the localization transition. As a result, the dynamical time-scales in the NEE regime of β-ensemble behave differently than the later models.

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